Free Semigroups of Large Critical Exponent

Abstract

For a convergence group equipped with an expanding coarse-cocycle, we construct finitely generated free subsemigroups, which we call $\textit{Bishop--Jones}$ $\textit{semigroups}$, of critical exponent arbitrarily close to but strictly less than the critical exponent of the ambient group. As an application, we show that for any lattice in the isometry group of the quaternionic hyperbolic space or the isometry group of the Cayley hyperbolic plane, there exist finitely generated free subsemigroups of critical exponent arbitrarily close to but strictly less than that of the ambient lattice. This shows no critical exponent gap for discrete subsemigroups in the isometry group of the quaternionic hyperbolic space or the isometry group of the Cayley hyperbolic plane, which is in contrast with Corlette's renowned gap theorem concerning infinite co-volume discrete subgroups of these rank one Lie groups. More generally, we prove that for any non-elementary transverse subgroup $\Gamma$ of a semisimple Lie group $G$, there exist finitely generated free Anosov subsemigroups in the sense of Kassel--Potrie of critical exponent arbitrarily close to but strictly less than that of the ambient transverse group. Furthermore, we show that these semigroups admit $\mathcal{C}$-regular quasi-isometric embeddings into the symmetric space $X$ of $G$, in the sense of Dey--Kim--Oh.

Locations

• arXiv (Cornell University) - View - PDF